Matrix multiplication: the hunt for $\omega$ (Mark Huber, CMC)
For centuries finding the determinant of a matrix was considered to be something that took $\Theta(n^3)$ steps. Only in 1969 did Strassen discover that there was a faster method. In […]
12 events found.
Events
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Millikan 2099, Pomona College 610 N. College Ave., Claremont, CA, United States
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A General Bayesian Discrete Time Survival Model (King, CPP)
Shanahan B460, Harvey Mudd College 301 Platt Blvd., Claremont, CA, United StatesAbstract: "We present a general Bayesian statistical model for discrete time, discrete state space stochastic processes. Applications include the modeling of recurrent and episodic disease processes, such as episodes of […]
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Geometry of quotient varieties and the algebra of conformal blocks (Han-Bom Moon Fordham University)
Roberts North 104, CMC 320 E. 9th St., Claremont, CA, United StatesAn important question in classical representation theory is when the tensor product of two irreducible representations has another representation as a factor. In this talk, I will introduce a quantum […]
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GEMS Workshop: “Graphs, matrices, and recurrences” with Professor Lucas Bang, from Harvey Mudd College
Shanahan 1480, Harvey Mudd College 301 Platt Blvd., Claremont, CA, United StatesTOPIC: Graphs, matrices, and recurrences Abstract: In mathematics, we are often surprised to find that problems that look very different are actually the same problem in a different guise! In […]
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Applied Math Talk: Solving Complex Public Health Problems—Cancer, Obesity and Aging (Jessica Dehart, CGU)
Emmy Noether Room, Millikan 1021, Pomona College 610 N. College Ave., Claremont, CaliforniaAbstract: Remember smoking? What’s the new public health problem? In the US, we are currently entangled within three converging and intertwined complex problems: Cancer, Obesity, Aging. There are over 16 […]
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Chow rings of heavy/light Hassett spaces via tropical geometry (Dagan Karp, HMC)
Millikan 2099, Pomona College 610 N. College Ave., Claremont, CA, United StatesIn this talk, I will try to give a fun introduction to tropical geometry and Hassett spaces, and show how tropical geometry can be used to compute the Chow rings […]
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Unravelling Biochemistry Mysteries: Knot Theory Applied to Biochemistry (Price, University of San Diego)
Shanahan B460, Harvey Mudd College 301 Platt Blvd., Claremont, CA, United StatesAbstract: Mathematical modeling is an effective resource for biologists since it provides ways to simplify, study and understand the complex systems common in biology and biochemistry. Many mathematical tools can […]
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Enhancements of the quandle coloring invariant for knots (Karina Cho, Harvey Mudd College)
Roberts North 104, CMC 320 E. 9th St., Claremont, CA, United StatesQuandles are algebraic structures that play nicely with knots. The multiplicative structure of finite quandles gives us a way to "color" knot diagrams, and the number of such colorings for […]
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Applied Math Talk: Nonlocal problems for linear evolution equations (Prof. Smith David Andrew, Yale-NUS College, Singapore)
Emmy Noether Room, Millikan 1021, Pomona College 610 N. College Ave., Claremont, CaliforniaLinear evolution equations, such as the heat equation, are commonly studied on finite spatial domains via initial-boundary value problems. In place of the boundary conditions, we consider “multipoint conditions”, where […]
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Theory of vertex Ho-Lee-Schur graphs (Sin-Min Lee, SJSU)
Millikan 2099, Pomona College 610 N. College Ave., Claremont, CA, United StatesA triple of natural numbers (a,b,c) is an S-set if a+b=c. I. Schur used the S-sets to show that for n >3, there exists s(n) such that for prime p […]
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A Conformal Mapping Approach to Shape Optimization Problems. (Kao, CMC)
Shanahan B460, Harvey Mudd College 301 Platt Blvd., Claremont, CA, United StatesAbstract: In this talk, a conformal mapping approach to shape optimization problems on planar domains will be discussed. In particular, spectral methods based on conformal mappings are proposed to solve Steklov eigenvalues and their related shape optimization problems in two dimensions. To apply spectral methods, we first reformulate the Steklov eigenvalue problem in the complex domain […]
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A (Z⊕Z)-family of knot quandles (Jim Hoste, Pitzer College)
Suppose K is an oriented knot in a 3-manifold M with regular neighborhood N (K). For each element γ ∈ π 1 (∂N (K)) we define a quandle Q γ (K; M) which generalizes the concept of the fundamental quandle of a knot. In particular, when γ is the meridian of K, we obtain the […]