Resection
发表于 2025-3-25 05:29:35
Bernard Shiffman,Andrew John Sommese’ (or the majors) interests on the merger issue were not accepted by the government. One institutional aspect of this regulatory framework was the power granted to the Treasurer under . and . to determine whether or not mergers among the largest financial firms can take place.. Number 82 recommended
Heresy
发表于 2025-3-25 10:54:34
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Additive
发表于 2025-3-25 15:44:55
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大洪水
发表于 2025-3-25 18:04:34
Bernard Shiffman,Andrew John Sommeseile interest rates that accompanied deregulation have caused firms with excess balances to demand effective cash management services, and required banks to price their loans to reflect the risk inherent in these loans, the shareholders’ demand for a competitive return on equity, and the increased co
crease
发表于 2025-3-25 23:19:17
es Financi{~res (SUERF), which took place at Helsing¢r, Denmark, in October 1980. The Society is supported by a large number of central banks, commercial banks, ·and other fmancial and business institutions, as well as by academics and others interested in monetary and fmancial problems. Since its e
conjunctivitis
发表于 2025-3-26 03:54:57
Generalizations of the Nakano Vanishing Theorem, Vanishing Theorem does not hold for these bundles, as shown below in Example (3.23). This chapter presents some generalizations of the Nakano Vanishing Theorem without strict positivity or negativity. First, we give a generalization to k-positive and k-negative line bundles. We then introduce a pow
inspiration
发表于 2025-3-26 08:23:18
Special Vanishing Theorems,apters V and VI, we use part of this theorem to extend the vanishing theorems of Chapters II and III to vector bundles. We then discuss line bundles on projective hypersurfaces, in particular quadrics, and on complete intersections. Finally, we state a vanishing theorem of Le Potier for Grassmannian
dry-eye
发表于 2025-3-26 09:50:38
Vector Bundles: Ampleness,h we discuss in Chapter VI, is the differential-geometric approach of Nakano and Griffiths that directly uses the Kodaira-Nakano identity. In this chapter, we discuss the other method, which is based on the concept of ampleness due to Grothendieck, Grauert, and Hartshorne and yields the vanishing th
notion
发表于 2025-3-26 16:22:25
Generalizations of the Kodaira Vanishing Theorem, , and Viehweg . We also give some additional characterizations of ampleness and state some vanishing theorems of Mumford and Grauert-Riemenschneider on singular spaces. We begin with the following generalization of Corollary (2.22) due to Ramanujam .
搬运工
发表于 2025-3-26 19:31:15
Generalizations of the Nakano Vanishing Theorem,erful “slicing technique” in order to further extend the Nakano Theorem. We also introduce the concept of k-ampleness and show the relationship between the First Lefschetz Theorem and the Nakano Theorem.