Andreas Juhl

Ledelsesbaseret coaching er blevet opdateret og udkommer i en 2. udgave, der også integrerer en del om coaching af teams og et kapitel om coaching af andre ledere. ”Når man coacher som leder, skal man coache som leder.” Skal coaching kunne fungere som et ledelsesværktøj, må det tage afsæt i de særlige vilkår, der er gældende på den enkelte arbejdsplads og for relationerne mellem leder, mellemleder og medarbejder - det er udgangspunktet for denne bog. I Ledelsesbaseret coaching giver forfatterne indgående beskrivelser af coachingværktøjer og omsætter dem til en ledelsesmæssig kontekst. De byder også på en række cases og praktiske anvisninger til, hvordan man tilegner sig en coachende ledelsesstil. Ledelsesbaseret coaching er skrevet til alle med interesse for coaching som organisatorisk og ledelsesmæssig praksis. Bogen henvender sig til organisations- og ledelseskonsulenter og studerende på kandidat-, diplom- og masteruddannelserne; men først og fremmest naturligvis til ledere på alle niveauer, der ønsker at bringe coaching et skridt videre ind i organisationerne som en ledelsesform, der rummer stort potentiale for udvikling og læring - for både medarbejdere og ledere.

Dynamical zeta functions are associated to dynamical systems with a countable set of periodic orbits. The dynamical zeta functions of the geodesic flow of lo­ cally symmetric spaces of rank one are known also as the generalized Selberg zeta functions. The present book is concerned with these zeta functions from a cohomological point of view. Originally, the Selberg zeta function appeared in the spectral theory of automorphic forms and were suggested by an analogy between Weil's explicit formula for the Riemann zeta function and Selberg's trace formula ([261]). The purpose of the cohomological theory is to understand the analytical properties of the zeta functions on the basis of suitable analogs of the Lefschetz fixed point formula in which periodic orbits of the geodesic flow take the place of fixed points. This approach is parallel to Weil's idea to analyze the zeta functions of pro­ jective algebraic varieties over finite fields on the basis of suitable versions of the Lefschetz fixed point formula. The Lefschetz formula formalism shows that the divisors of the rational Hassc-Wcil zeta functions are determined by the spectra of Frobenius operators on l-adic cohomology.

Conformal invariants (conformally invariant tensors, conformally covariant differential operators, conformal holonomy groups etc.) are of central significance in differential geometry and physics. Well-known examples of such operators are the Yamabe-, the Paneitz-, the Dirac- and the twistor operator. The aim of the seminar was to present the basic ideas and some of the recent developments around Q-curvature and conformal holonomy. The part on Q-curvature discusses its origin, its relevance in geometry, spectral theory and physics. Here the influence of ideas which have their origin in the AdS/CFT-correspondence becomes visible. The part on conformal holonomy describes recent classification results, its relation to Einstein metrics and to conformal Killing spinors, and related special geometries.

A basic problem in geometry is to ?nd canonical metrics on smooth manifolds. Such metrics can be speci?ed, for instance, by curvature conditions or extremality properties, and are expected to contain basic information on the topology of the underlying manifold. Constant curvature metrics on surfaces are such canonical metrics. Their distinguished role is emphasized by classical uniformization theory. Amorerecentcharacterizationofthesemetrics describes them ascriticalpoints of the determinant functional for the Laplacian.The key tool here is Polyakov'sva- ationalformula for the determinant. In higher dimensions, however,it is necessary to further restrict the problem, for instance, to the search for canonical metrics in conformal classes. Here two metrics are considered to belong to the same conf- mal class if they di?er by a nowhere vanishing factor. A typical question in that direction is the Yamabe problem ([165]), which asks for constant scalar curvature metrics in conformal classes. In connection with the problem of understanding the structure of Polyakov type formulas for the determinants of conformally covariant di?erential operators in higher dimensions, Branson ([31]) discovered a remarkable curvature quantity which now is called Branson's Q-curvature. It is one of the main objects in this book.

I Lederen som teamcoach får du en lang række redskaber, som vil ruste dig bedre til at coache grupper af individer. Bogen introducerer dig til de lederpositioner, du mest fordelagtigt kan indtage i forskellige situationer i forhold til teams: Hvornår arbejder jeg som coach? hvornår som chef? Du får en klar definition på, hvad et team egentlig er, og hvordan et team ofte vil udvikle sig. Og så får du først og fremmest en mængde konkrete værktøjer, spørgeteknikker, fasemodeller mv., som vil kunne styrke din praksis som teamcoach. Bogen er endvidere spækket med eksempler og cases.

Denne bog om teamarbejde er rettet mod lederen, der skal igangsætte, udvikle og følge op på teamarbejde i sin organisation. Her sættes fokus på de udfordringer, det stiller til lederen samt på, hvorfor netop teamorganisering har vist sig velegnet til at fremme læreprocesser i organisationer.Bogen gennemgår både teoretisk, metodisk og gennem illustrative cases bl.a.:-Teamudvikling-Aktiv teamledelse-TeamcoachingForfatterne, der alle er knyttet til konsulentvirksomheden Attractor, baserer bogen på de systematiske og anerkendende ideer.

Dynamical zeta functions are associated to dynamical systems with a countable set of periodic orbits. The dynamical zeta functions of the geodesic flow of lo­ cally symmetric spaces of rank one are known also as the generalized Selberg zeta functions. The present book is concerned with these zeta functions from a cohomological point of view. Originally, the Selberg zeta function appeared in the spectral theory of automorphic forms and were suggested by an analogy between Weil's explicit formula for the Riemann zeta function and Selberg's trace formula ([261]). The purpose of the cohomological theory is to understand the analytical properties of the zeta functions on the basis of suitable analogs of the Lefschetz fixed point formula in which periodic orbits of the geodesic flow take the place of fixed points. This approach is parallel to Weil's idea to analyze the zeta functions of pro­ jective algebraic varieties over finite fields on the basis of suitable versions of the Lefschetz fixed point formula. The Lefschetz formula formalism shows that the divisors of the rational Hassc-Wcil zeta functions are determined by the spectra of Frobenius operators on l-adic cohomology.