31![NOETHERIAN MODULES KEITH CONRAD 1. Introduction In a finite-dimensional vector space, every subspace is finite-dimensional and the dimension of a subspace is at most the dimension of the whole space. Unfortunately, the n NOETHERIAN MODULES KEITH CONRAD 1. Introduction In a finite-dimensional vector space, every subspace is finite-dimensional and the dimension of a subspace is at most the dimension of the whole space. Unfortunately, the n](https://www.pdfsearch.io/img/550a16f268ddac58a4859bf74d439fca.jpg) | Add to Reading ListSource URL: www.math.uconn.eduLanguage: English - Date: 2014-03-03 14:09:51
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32![SEPARABILITY KEITH CONRAD 1. Introduction Let K be a field. We are going to look at concepts related to K that fall under the label “separable”. SEPARABILITY KEITH CONRAD 1. Introduction Let K be a field. We are going to look at concepts related to K that fall under the label “separable”.](https://www.pdfsearch.io/img/5f497875d7cc56d41335f49571c11ffb.jpg) | Add to Reading ListSource URL: www.math.uconn.eduLanguage: English - Date: 2014-08-22 08:47:29
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33![PRIME SPECIALIZATION IN HIGHER GENUS I BRIAN CONRAD AND KEITH CONRAD Abstract. A classical conjecture predicts how often a polynomial in Z[T ] takes prime values. The natural analogous conjecture for prime values of a po PRIME SPECIALIZATION IN HIGHER GENUS I BRIAN CONRAD AND KEITH CONRAD Abstract. A classical conjecture predicts how often a polynomial in Z[T ] takes prime values. The natural analogous conjecture for prime values of a po](https://www.pdfsearch.io/img/8c9c54a8c68e90c595334f4092265c8f.jpg) | Add to Reading ListSource URL: math.stanford.eduLanguage: English - Date: 2007-08-09 18:48:37
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34![REMARKS ABOUT EUCLIDEAN DOMAINS KEITH CONRAD 1. Introduction The following definition of a Euclidean (not Euclidian!) domain is very common in textbooks. We write N for {0, 1, 2, . . . }. REMARKS ABOUT EUCLIDEAN DOMAINS KEITH CONRAD 1. Introduction The following definition of a Euclidean (not Euclidian!) domain is very common in textbooks. We write N for {0, 1, 2, . . . }.](https://www.pdfsearch.io/img/f92d3a116260fc1341427983fef0528a.jpg) | Add to Reading ListSource URL: www.math.uconn.eduLanguage: English - Date: 2016-07-05 09:23:56
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35![](/pdf-icon.png) | Add to Reading ListSource URL: ephesians-511.netLanguage: English - Date: 2015-11-21 22:33:51
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36![A BRIEF INTODUCTION TO ADIC SPACES BRIAN CONRAD 1. Valuation spectra and Huber/Tate rings 1.1. Introduction. Although we begin the oral lectures with a crash course on some basic highlights from rigid-analytic geometry i A BRIEF INTODUCTION TO ADIC SPACES BRIAN CONRAD 1. Valuation spectra and Huber/Tate rings 1.1. Introduction. Although we begin the oral lectures with a crash course on some basic highlights from rigid-analytic geometry i](https://www.pdfsearch.io/img/c3c2b52bea4eecbe1c9c7fff9d8faad7.jpg) | Add to Reading ListSource URL: math.stanford.eduLanguage: English - Date: 2018-03-15 14:59:55
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37![TENSOR PRODUCTS II KEITH CONRAD 1. Introduction Continuing our study of tensor products, we will see how to combine two linear maps M −→ M 0 and N −→ N 0 into a linear map M ⊗R N → M 0 ⊗R N 0 . This leads t TENSOR PRODUCTS II KEITH CONRAD 1. Introduction Continuing our study of tensor products, we will see how to combine two linear maps M −→ M 0 and N −→ N 0 into a linear map M ⊗R N → M 0 ⊗R N 0 . This leads t](https://www.pdfsearch.io/img/2f74bd3f22971b0d1d37fe3c1672c1d1.jpg) | Add to Reading ListSource URL: www.math.uconn.eduLanguage: English - Date: 2018-05-05 19:15:40
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38![LIFTING GLOBAL REPRESENTATIONS WITH LOCAL PROPERTIES BRIAN CONRAD 1. Introduction Let k be a global field, with Galois group Gk and Weil group Wk relative to a choice of separable closure ks /k. Let Γ be either Gk or Wk LIFTING GLOBAL REPRESENTATIONS WITH LOCAL PROPERTIES BRIAN CONRAD 1. Introduction Let k be a global field, with Galois group Gk and Weil group Wk relative to a choice of separable closure ks /k. Let Γ be either Gk or Wk](https://www.pdfsearch.io/img/b76953777240e1143e7f7697482716b1.jpg) | Add to Reading ListSource URL: math.stanford.eduLanguage: English - Date: 2011-12-11 23:16:10
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39![THE HURWITZ THEOREM ON SUMS OF SQUARES BY REPRESENTATION THEORY KEITH CONRAD 1. Introduction From commutativity of multiplication (for numbers), a product of two squares is a square: THE HURWITZ THEOREM ON SUMS OF SQUARES BY REPRESENTATION THEORY KEITH CONRAD 1. Introduction From commutativity of multiplication (for numbers), a product of two squares is a square:](https://www.pdfsearch.io/img/f73651f396f1429c8ca61b86b6a240eb.jpg) | Add to Reading ListSource URL: www.math.uconn.eduLanguage: English - Date: 2016-12-15 09:50:53
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40![ISOMETRIES OF Rn KEITH CONRAD 1. Introduction An isometry of Rn is a function h : Rn → Rn that preserves the distance between vectors: ||h(v) − h(w)|| = ||v − w|| ISOMETRIES OF Rn KEITH CONRAD 1. Introduction An isometry of Rn is a function h : Rn → Rn that preserves the distance between vectors: ||h(v) − h(w)|| = ||v − w||](https://www.pdfsearch.io/img/c68ac6dd092533990c968f32041b3f36.jpg) | Add to Reading ListSource URL: www.math.uconn.eduLanguage: English - Date: 2017-05-11 21:27:36
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