Tag Archives: hall inner product

Polynomials and Representations XXXIII

Posted on June 23, 2016 by limsup

We are back to the convention and We wish to focus on irreducible polynomial representations of G. The weak Peter-Weyl theorem gives: Theorem. Restricting the RHS to only polynomial irreducible V gives us on the LHS, where each polynomial in restricts to a function … Continue reading

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Polynomials and Representations XXI

Posted on May 30, 2016 by limsup

We have established that all irreps of are defined over and hence any field of characteristic 0. For convenience we will fix . Twists For any group G and representation over  if is a group homomorphism, we can twist as follows: Sometimes, we also … Continue reading

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Polynomials and Representations XX

Posted on May 28, 2016 by limsup

From now onwards, we will assume the base field K has characteristic 0. Example: d=3 Following the previous article, we examine the case of . We get 3 partitions: , and Let us compute for all From the previous article, we have: Since , is … Continue reading

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Polynomials and Representations X

Posted on May 12, 2016 by limsup

Cauchy’s Identity In this article, our primary focus is the ring of symmetric polynomials in Theorem (Cauchy’s Identity). Consider polynomials over all partitions [Recall that  if ] We have an equality of formal power series: Note. For convenience, we will use  … Continue reading

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Polynomials and Representations IX

Posted on May 11, 2016 by limsup

Hall Inner Product Let us resume our discussion of symmetric polynomials. First we define an inner product on d-th component of the formal ring. Recall that the sets are both -bases of . Definition. The Hall inner product is defined by setting and to be … Continue reading

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