In this volume the author further develops his philosophy of quantum interpolation between the real numbers and the p-adic numbers. The p-adic numbers contain the p-adic integers Zp which are the inverse limit of the finite rings Z/pn. This gives rise to a tree, and probability measures w on Zp correspond to Markov chains on this tree. From the tree structure one obtains special basis for the Hilbert space L2(Zp, w). The real analogue of the p-adic integers is the interval [-1, 1], and a probability measure w on it gives rise to a special basis for L2([-1, 1], w) - the orthogonal polynomials, and to a Markov chain on qfinite approximationsq of [-1, 1]. For special (gamma and beta) measures there is a qquantumq or qq-analogueq Markov chain, and a special basis, that within certain limits yield the real and the p-adic theories. This idea can be generalized variously. In representation theory, it is the quantum general linear group GLn(q)that interpolates between the p-adic group GLn(Zp), and between its real (and complex) analogue -the orthogonal On (and unitary Un )groups. There is a similar quantum interpolation between the real and p-adic Fourier transform and between the real and p-adic (local unramified part of) Tate thesis, and Weil explicit sums.1816: S. Albeverio, W. Schachermayer, M. Tala- grand, Lectures on Probability Theory and Statistics. ... 1841: W. Reichel, Uniqueness Theorems for Variational Problems by the Method of Transformation Groups (2004) Vol. 1842: T. Johnsen anbsp;...

Title | : | Arithmetical Investigations |

Author | : | Shai M. J. Haran |

Publisher | : | Springer Science & Business Media - 2008-04-25 |

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