Part 1 Introduction to Strings

We then compute the cyclic spectrum of any finitely generated Boolean flow. We define when a sheaf of Boolean flows can be regarded as cyclic and find necessary conditions

• four-dimensional supersymmetric (SUSY) gauge theory provides a framework in which the classes of EHIs known at the time arise as a particular partition function, called

The aim of this leture is to present a sequence of theorems and results starting with Holladay’s classical results concerning the variational prop- erty of natural cubic splines

In the language of category theory, Stone’s representation theorem means that there is a duality between the category of Boolean algebras (with homomorphisms) and the category of

Functions on M are said to be bandlimited if their Fourier transform has compact support. Such func- tions have many remarkable properties. In particu- lar, they are determined by

Keywords: Logarithmic potential, Polynomial approximation, Rational approximation, Trans- finite diameter, Capacity, Chebyshev constant, Fekete points, Equilibrium potential,

Although I admittedly do not understand string theory from a physical point of view, I do think (most of my colleagues from algebraic QFT do not share such optimistic ideas) that

1994 Seiberg-Witten computed the prepotential of N = 2 SUSY YM theory (physical counterpart of Donaldson invariants) via periods of Riemann surfaces (SW curve).. 1997