Alex received his Ph.D. in 2013 from the University of Notre Dame under the supervision of Matthew Dyer. His research interests are in algebra and combinatorics; more specifically his research focuses on Coxeter groups, Representations of Hecke Algebras, and root systems of reflection systems.

You can find his website here:

https://sites.google.com/site/diazlopezalexander/

We'd like to thank Alexander for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

PODCAST: http://sensemakesmath.buzzsprout.com/

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

Alex received his Ph.D. in 2013 from the University of Notre Dame under the supervision of Matthew Dyer. His research interests are in algebra and combinatorics; more specifically his research focuses on Coxeter groups, Representations of Hecke Algebras, and root systems of reflection systems.

You can find his website here:

https://sites.google.com/site/diazlopezalexander/

We'd like to thank Alexander for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

PODCAST: http://sensemakesmath.buzzsprout.com/

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

His research is in the field of Set Theory, in particular, he studies subsets of the Real Numbers and their behavior under different axioms and forcing extensions.

His website can be found here:

https://www.math.wisc.edu/~ongay/

We'd like to thank Iván for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

PODCAST: http://sensemakesmath.buzzsprout.com/

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

His research is in the field of Set Theory, in particular, he studies subsets of the Real Numbers and their behavior under different axioms and forcing extensions.

His website can be found here:

https://www.math.wisc.edu/~ongay/

We'd like to thank Iván for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

PODCAST: http://sensemakesmath.buzzsprout.com/

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

His research is in the field of Set Theory, in particular, he studies subsets ...]]>

His research is in mathematical physics, more precisely he is interested in the interactions of quantum field theory with topology, homological/homotopical algebra and supergeometry.

His website is here: https://www3.nd.edu/~pmnev/

We would like to thank Pavel for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

PODCAST: http://sensemakesmath.buzzsprout.com/

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

His research is in mathematical physics, more precisely he is interested in the interactions of quantum field theory with topology, homological/homotopical algebra and supergeometry.

His website is here: https://www3.nd.edu/~pmnev/

We would like to thank Pavel for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

PODCAST: http://sensemakesmath.buzzsprout.com/

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

Her current research is in understanding limits of Riemann surfaces with conical singularities from a geometric analysis point of view. She has previously worked on studying Poisson structures on twistor spaces of Hyperkhaler and HKT Manifolds for her Masters Degree at Florida International University.

Her website is here: https://www.math.stonybrook.edu/~lisandra/

We would like to thank Lisandra for being on our show "Meet a Mathematician" and for sharing her stories and perspective with us!

www.sensemakesmath.com

PODCAST: http://sensemakesmath.buzzsprout.com/

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

Her current research is in understanding limits of Riemann surfaces with conical singularities from a geometric analysis point of view. She has previously worked on studying Poisson structures on twistor spaces of Hyperkhaler and HKT Manifolds for her Masters Degree at Florida International University.

Her website is here: https://www.math.stonybrook.edu/~lisandra/

We would like to thank Lisandra for being on our show "Meet a Mathematician" and for sharing her stories and perspective with us!

www.sensemakesmath.com

PODCAST: http://sensemakesmath.buzzsprout.com/

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

Her current research is in understanding limits of Riemann surfaces with conical singularitie...]]>

Harry’s research interests include mathematical and biochemical tools for improving transplant outcomes, machine learning applied to text datasets, and wider applications of mathematics and machine learning techniques in protein biochemistry. He has worked with the New Zealand Department of Conservation to stop the extinction of the land snail Powelliphanta Augusta, is the cofounder of an online software retail company called Moonbox Software, and currently works for the Institute for Advanced Teaching and Learning at the University of Warwick to produce interdisciplinary and applied maths online teaching materials.

We talk about the differences between Pure and Applied Math(s) and Mathematicians, His research saving an endangered species of snails in New Zealand, machine-learning on text datasets, and much more!

We would like to thank Harry for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

PODCAST: http://sensemakesmath.buzzsprout.com/

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

Harry’s research interests include mathematical and biochemical tools for improving transplant outcomes, machine learning applied to text datasets, and wider applications of mathematics and machine learning techniques in protein biochemistry. He has worked with the New Zealand Department of Conservation to stop the extinction of the land snail Powelliphanta Augusta, is the cofounder of an online software retail company called Moonbox Software, and currently works for the Institute for Advanced Teaching and Learning at the University of Warwick to produce interdisciplinary and applied maths online teaching materials.

We talk about the differences between Pure and Applied Math(s) and Mathematicians, His research saving an endangered species of snails in New Zealand, machine-learning on text datasets, and much more!

We would like to thank Harry for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

PODCAST: http://sensemakesmath.buzzsprout.com/

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

Harry’s research inte...]]>

His main area of research is analysis and partial differential equations. He has done research in Control Theory, Inverse Problems, Spectral and Scattering theory for Schrodinger operators as well as work in voting theory.

We talk about his journey through grad school and being hired as a professor, what it's like being the chair of the mathematics department, his research in control theory and voting theory,

His website can be found here:

http://faculty.fiu.edu/~edwardj/

We'd like to thank Julian for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

PODCAST: http://sensemakesmath.buzzsprout.com/

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

His main area of research is analysis and partial differential equations. He has done research in Control Theory, Inverse Problems, Spectral and Scattering theory for Schrodinger operators as well as work in voting theory.

We talk about his journey through grad school and being hired as a professor, what it's like being the chair of the mathematics department, his research in control theory and voting theory,

His website can be found here:

http://faculty.fiu.edu/~edwardj/

We'd like to thank Julian for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

PODCAST: http://sensemakesmath.buzzsprout.com/

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

His main...]]>

His research is in Algebraic Topology, specifically in unstable homotopy theory. He is also interested in philosophy of math and areas of intersection between mathematics and economics. He is deeply passionate about teaching mathematics in innovative and effective ways.

We talk about his journey through mathematics, as well as teaching mathematics (flipped classrooms) and philosophy of math.

His website can be found here:

https://pjedlovec.github.io/

We'd like to thank PJ for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

PODCAST: http://sensemakesmath.buzzsprout.com/

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

His research is in Algebraic Topology, specifically in unstable homotopy theory. He is also interested in philosophy of math and areas of intersection between mathematics and economics. He is deeply passionate about teaching mathematics in innovative and effective ways.

We talk about his journey through mathematics, as well as teaching mathematics (flipped classrooms) and philosophy of math.

His website can be found here:

https://pjedlovec.github.io/

We'd like to thank PJ for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

PODCAST: http://sensemakesmath.buzzsprout.com/

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

His research is in Algebraic Topology, specifically in un...]]>

His research is on characteristic p methods in commutative algebra, symbolic powers of ideals, combinatorial commutative algebra, and representations of quivers.

His website can be found here:

https://www.math.missouri.edu/people/maddox

We'd like to thank Kyle for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

PODCAST: http://sensemakesmath.buzzsprout.com/

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

His research is on characteristic p methods in commutative algebra, symbolic powers of ideals, combinatorial commutative algebra, and representations of quivers.

His website can be found here:

https://www.math.missouri.edu/people/maddox

We'd like to thank Kyle for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

PODCAST: http://sensemakesmath.buzzsprout.com/

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

His research is on characteristic p methods in commutative algebra, symbolic powers of ideals, combinatorial commutative algebra, and repres...]]>

His research is in Number Theory, Automorphic Forms, Arithmetic Geometry, and Harmonic Analysis on Lie Groups.

Ramin has coauthored the books "An Introduction to Mathematical Olympiads", "An Invitation to Modern Number Theory" and, most recently, he is the author of the new book:

"A Pythagorean Introduction to Number Theory: Triangles, Sums of Squares & Arithmetic"

available here: https://www.amazon.com/Pythagorean-Introduction-Number-Theory-Undergraduate/dp/3030026035

His website can be found here:

http://homepages.math.uic.edu/~rtakloo/

We'd like to thank Ramin for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

PODCAST: http://sensemakesmath.buzzsprout.com/

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

His research is in Number Theory, Automorphic Forms, Arithmetic Geometry, and Harmonic Analysis on Lie Groups.

Ramin has coauthored the books "An Introduction to Mathematical Olympiads", "An Invitation to Modern Number Theory" and, most recently, he is the author of the new book:

"A Pythagorean Introduction to Number Theory: Triangles, Sums of Squares & Arithmetic"

available here: https://www.amazon.com/Pythagorean-Introduction-Number-Theory-Undergraduate/dp/3030026035

His website can be found here:

http://homepages.math.uic.edu/~rtakloo/

We'd like to thank Ramin for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

PODCAST: http://sensemakesmath.buzzsprout.com/

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

Prasit is an Algebraic Topologist, specifically his research is on computational aspects of Stable Homotopy Theory.

His website can be found here:

http://www.people.virginia.edu/~pb9wh/

We would like to thank Prasit for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

Prasit is an Algebraic Topologist, specifically his research is on computational aspects of Stable Homotopy Theory.

His website can be found here:

http://www.people.virginia.edu/~pb9wh/

We would like to thank Prasit for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

Prasit is an Algebraic Topologist, specifically his research i...]]>

Liviu is a Geometer "at large" and a probabilist by accident. His field of expertise is global analysis with emphasis on the geometric applications of elliptic partial differential equations arising from gauge theory, symplectic geometry, and index theory for Dirac operators.

He is the author of several books, including:

"An Invitation to Morse Theory"

"The Reidemeister Torsion of 3-Manifolds"

"Notes on Seiberg-Witten Theory"

and most recently, he is the author of

"Notes on Elementary Probability Theory"

which we discuss at length in the podcast!

His website can be found here:

https://www3.nd.edu/~lnicolae/

We'd like to thank Liviufor being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

Liviu is a Geometer "at large" and a probabilist by accident. His field of expertise is global analysis with emphasis on the geometric applications of elliptic partial differential equations arising from gauge theory, symplectic geometry, and index theory for Dirac operators.

He is the author of several books, including:

"An Invitation to Morse Theory"

"The Reidemeister Torsion of 3-Manifolds"

"Notes on Seiberg-Witten Theory"

and most recently, he is the author of

"Notes on Elementary Probability Theory"

which we discuss at length in the podcast!

His website can be found here:

https://www3.nd.edu/~lnicolae/

We'd like to thank Liviufor being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

Dominic is a homotopy theorist with particular interests in chromatic homotopy theory and the spectrum of topological modular forms. He is also interested in the interaction between chromatic, motivic, and equivariant homotopy theory.

His website can be found here:

https://faculty.math.illinois.edu/~dc...

We'd like to thank Dominic for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

Dominic is a homotopy theorist with particular interests in chromatic homotopy theory and the spectrum of topological modular forms. He is also interested in the interaction between chromatic, motivic, and equivariant homotopy theory.

His website can be found here:

https://faculty.math.illinois.edu/~dc...

We'd like to thank Dominic for being on our show "Meet a Mathematician" and for sharing his stories and perspective with us!

www.sensemakesmath.com

TWITTER: @SenseMakesMath

PATREON: https://www.patreon.com/sensemakesmath

FACEBOOK: https://www.facebook.com/SenseMakesMath

STORE: https://sensemakesmath.storenvy.com]]>

Dominic is a homotopy theorist with pa...]]>